Conformal embeddings in affine vertex superalgebras

Abstract

This paper is a natural continuation of our previous work on conformal embeddings of vertex algebras [6], [7], [8]. Here we consider conformal embeddings in simple affine vertex superalgebra Vk( g) where g= g 0 g 1 is a basic classical simple Lie superalgebras. Let Vk ( g 0) be the subalgebra of Vk( g) generated by g 0. We first classify all levels k for which the embedding Vk ( g 0) in Vk( g) is conformal. Next we prove that, for a large family of such conformal levels, Vk( g) is a completely reducible Vk ( g 0)--module and obtain decomposition rules. Proofs are based on fusion rules arguments and on the representation theory of certain affine vertex algebras. The most interesting case is the decomposition of V-2 (osp(2n +8 2n)) as a finite, non simple current extension of V-2 (Dn+4) V1 (Cn). This decomposition uses our previous work [10] on the representation theory of V-2 (Dn+4).